|Delivery Type||Delivery length / details|
|Lecture||40 hours lectures|
|Seminars / Tutorials||5 hours tutorials|
|Assessment Type||Assessment length / details||Proportion|
|Semester Exam||3 Hours End of semester examinations||80%|
|Semester Assessment||2 Open Book tests and 4 assignments||20%|
|Supplementary Exam||3 Hours written examination Programmable calculators are NOT allowed||100%|
After taking this module the student should be able to:
- Use algebraic techniques confidently to solve physical and mathematical problems.
- Demonstrate a knowledge of trigonometrical functions and the relations between them.
- Demonstrate a knowledge of vectors and use them to solve simple problems.
- Demonstrate a knowledge of complex numbers and use them to solve simple problems.
- Demonstrate a knowledge of differentiation and the relation between dy/dx and the gradient of the curve y(x).
This module introduces the student to some of the basic mathematical tools commonly used in the physical sciences. Topics covered include algabraic techniques, logarithms, trigonometry, an introduction to vectors, comples numbers and differentiation. Particular emphasis is placed on the use of mathematical techniques to solve physical problems.
Algebraic techniques: linear and quadratic equations, factorisation, transposition of formulae, equations involving fractions, sumultaneous equations. Indicial, exponential and logarithmic equations.
Trigonometry: Sine and cosine rules. Graphs of trigonometrical functions. Trigonometric equations and identities including addition and double angle formulae.
Vectors: Vector representation, unit vectors, position vectors, vector components, vector addition, scalar product.
Complex Numbers: Introduction to complex numbers, multiplication and division in polar form, de Moivre's theorem, powers and roots of complex numbers.
Differentiation and its applications: Gradient of a curve, equation of a straight line, tangents and normals, rates of change, stationary values and turning points, curve sketching.
Reading ListEssential Reading
Bostock, L. (1990(1992 print) Core maths for A-level /L. Bostock, S. Chandler. Thornes Primo search Bostock, L. (2000.) Core maths for advanced level /L. Bostock, S. Chandler. 3rd ed. Stanley Thornes Primo search Recommended Text
Sadler, A. J. (1987.) Understanding pure mathematics /A.J. Sadler, D.W.S. Thorning. Oxford University Press Primo search Supplementary Text
Stroud, K. A. (2003.) Advanced engineering mathematics :a new edition of Further engineering mathematics. 4th ed. Palgrave Macmillan Primo search
This module is at CQFW Level 3